The geometric R-matrix for affine crystals of type A

Abstract

In [Frieden, arXiv:1706.02844], we constructed a geometric crystal on the variety Xk := Gr(k,n) × C× which tropicalizes to the affine crystal structure on rectangular tableaux with n-k rows. In this sequel, we define and study the geometric R-matrix, a birational map R : Xk1 × Xk2 → Xk2 × Xk1 which tropicalizes to the combinatorial R-matrix on pairs of rectangular tableaux. We show that R is an isomorphism of geometric crystals, and that it satisfies the Yang--Baxter relation. In the case where both tableaux have one row, we recover a birational action of the symmetric group that has appeared in the literature in a number of contexts. We also define a rational function E : Xk1 × Xk2 → C which tropicalizes to the coenergy function from affine crystal theory. Most of the properties of the geometric R-matrix follow from the fact that it gives the unique solution to a certain equation of matrices in the loop group GLn(C(λ)).